AbstractWith x and y noncommutative indeterminates, a natural presentation of z = log(exey) as a sum of group conjugates of x and y is shown to depend on the fact that the terms involving the cyclic shifts of any fixed word other than x or y in the power series presentation of z sum to zero
Graduation date: 2017In 2014, W. Bogley identified a relation between the algebraic and geometric pr...
Let W be a Coxeter group. We provide a precise description of the conjugacy classes in W, yielding a...
AbstractWe prove an identity which lifts a hyper-Kloosterman sum to an exponential sum over a quadra...
AbstractWith x and y noncommutative indeterminates, a natural presentation of z = log(exey) as a sum...
Contains fulltext : mmubn000001_251959449.pdf (publisher's version ) (Open Access)...
AbstractWe consider the unique power series E(x)=ex=exp(x) and L(x)=log(1+x) with rational coefficie...
AbstractWe show that the cyclic derivative of any algebraic formal power series in noncommuting vari...
AbstractThe Goldberg presentation of the formal series for log(exey) in noncommutative symbols x and...
We prove that for no nontrivial ordered abelian group G, the ordered power series field R((G)) admit...
The main result proved in this paper is that the conjugacy problem in word-hyperbolic groups is solv...
AbstractSequences of numbers abound in combinatorics the generating functions of which are algebraic...
We study the regularity of several languages derived from conjugacy classes in a finitely generated ...
In this paper it is proved that having a logarithm is equivalent to having roots of arbitrary order ...
AbstractLetAndenote thenth-cycle index polynomial, in the variablesXj, for the symmetric group onnle...
We study the regularity of several languages derived from conjugacy classes in a finitely generated ...
Graduation date: 2017In 2014, W. Bogley identified a relation between the algebraic and geometric pr...
Let W be a Coxeter group. We provide a precise description of the conjugacy classes in W, yielding a...
AbstractWe prove an identity which lifts a hyper-Kloosterman sum to an exponential sum over a quadra...
AbstractWith x and y noncommutative indeterminates, a natural presentation of z = log(exey) as a sum...
Contains fulltext : mmubn000001_251959449.pdf (publisher's version ) (Open Access)...
AbstractWe consider the unique power series E(x)=ex=exp(x) and L(x)=log(1+x) with rational coefficie...
AbstractWe show that the cyclic derivative of any algebraic formal power series in noncommuting vari...
AbstractThe Goldberg presentation of the formal series for log(exey) in noncommutative symbols x and...
We prove that for no nontrivial ordered abelian group G, the ordered power series field R((G)) admit...
The main result proved in this paper is that the conjugacy problem in word-hyperbolic groups is solv...
AbstractSequences of numbers abound in combinatorics the generating functions of which are algebraic...
We study the regularity of several languages derived from conjugacy classes in a finitely generated ...
In this paper it is proved that having a logarithm is equivalent to having roots of arbitrary order ...
AbstractLetAndenote thenth-cycle index polynomial, in the variablesXj, for the symmetric group onnle...
We study the regularity of several languages derived from conjugacy classes in a finitely generated ...
Graduation date: 2017In 2014, W. Bogley identified a relation between the algebraic and geometric pr...
Let W be a Coxeter group. We provide a precise description of the conjugacy classes in W, yielding a...
AbstractWe prove an identity which lifts a hyper-Kloosterman sum to an exponential sum over a quadra...